Use Product Rule: \({x}^{a}{x}^{b}={x}^{a+b}\).
\[Righta{r}^{2}owq{u}^{3}-{Bu}^{2}+4a+3=0\]
Add \({Bu}^{2}\) to both sides.
\[Righta{r}^{2}owq{u}^{3}+4a+3={Bu}^{2}\]
Subtract \(4a\) from both sides.
\[Righta{r}^{2}owq{u}^{3}+3={Bu}^{2}-4a\]
Subtract \(3\) from both sides.
\[Righta{r}^{2}owq{u}^{3}={Bu}^{2}-4a-3\]
Divide both sides by \(Ri\).
\[ghta{r}^{2}owq{u}^{3}=\frac{{Bu}^{2}-4a-3}{Ri}\]
Divide both sides by \(h\).
\[gta{r}^{2}owq{u}^{3}=\frac{\frac{{Bu}^{2}-4a-3}{Ri}}{h}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Ri}}{h}\) to \(\frac{{Bu}^{2}-4a-3}{Rih}\).
\[gta{r}^{2}owq{u}^{3}=\frac{{Bu}^{2}-4a-3}{Rih}\]
Divide both sides by \(t\).
\[ga{r}^{2}owq{u}^{3}=\frac{\frac{{Bu}^{2}-4a-3}{Rih}}{t}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Rih}}{t}\) to \(\frac{{Bu}^{2}-4a-3}{Riht}\).
\[ga{r}^{2}owq{u}^{3}=\frac{{Bu}^{2}-4a-3}{Riht}\]
Divide both sides by \(a\).
\[g{r}^{2}owq{u}^{3}=\frac{\frac{{Bu}^{2}-4a-3}{Riht}}{a}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Riht}}{a}\) to \(\frac{{Bu}^{2}-4a-3}{Rihta}\).
\[g{r}^{2}owq{u}^{3}=\frac{{Bu}^{2}-4a-3}{Rihta}\]
Divide both sides by \({r}^{2}\).
\[gowq{u}^{3}=\frac{\frac{{Bu}^{2}-4a-3}{Rihta}}{{r}^{2}}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Rihta}}{{r}^{2}}\) to \(\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}}\).
\[gowq{u}^{3}=\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}}\]
Divide both sides by \(o\).
\[gwq{u}^{3}=\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}}}{o}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}}}{o}\) to \(\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}o}\).
\[gwq{u}^{3}=\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}o}\]
Divide both sides by \(w\).
\[gq{u}^{3}=\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}o}}{w}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}o}}{w}\) to \(\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}ow}\).
\[gq{u}^{3}=\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}ow}\]
Divide both sides by \(q\).
\[g{u}^{3}=\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}ow}}{q}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}ow}}{q}\) to \(\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}owq}\).
\[g{u}^{3}=\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}owq}\]
Divide both sides by \({u}^{3}\).
\[g=\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}owq}}{{u}^{3}}\]
Simplify \(\frac{\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}owq}}{{u}^{3}}\) to \(\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}owq{u}^{3}}\).
\[g=\frac{{Bu}^{2}-4a-3}{Rihta{r}^{2}owq{u}^{3}}\]
g=(Bu^2-4*a-3)/(Ri*h*t*a*r^2*o*w*q*u^3)
